24x^4/3x=
4X(6x^3)
what am i doing wrong
24x^4/3x
24/4=3 and x^4/x= x^3 so the answer is 3x^3
24x^4
24=4x(6x^3)
is this right i wrote it down wrong
To find the correct simplification of the expression 24x^4/3x, we need to apply the rules of simplifying fractions and combining like terms.
Let's break down the steps:
1. Simplify the expression by canceling out common factors:
In the numerator, the common factor in 24 and 3 is 3.
In the denominator, the common factor in 3x and x is x.
Canceling out the common factor, we have:
(24 ÷ 3) * (x^4 ÷ x)
= 8 * x^(4-1)
= 8x^3
2. Now, let's compare this result with the expression 4x(6x^3):
4x(6x^3) = 4 * 6 * (x * x^3) = 24x^4
So, the correct simplification of the expression 24x^4/3x is 8x^3. It seems like you made a mistake in canceling out the common factor, which led to an incorrect result of 4x(6x^3).